Material characterization

The investigation of permittivity in granite rock is a significant undertaking aimed at characterizing its electromagnetic properties. This measurement plays a pivotal role in understanding the material behavior in the study of rock breaking, contributing to a more comprehensive insight into this field.

Permittivity measurement

Many microwave-based techniques have been developed to measure the exact complex permittivity at specific frequencies for non-destructive testing [Reference Krupka5, Reference Kajfez6]. One of the critical parameters in measuring the permittivity of the complex is the accurate measurement of the quality factor, or Q-factor. The use of the reflection method is one approach that has been introduced for this purpose. In this method, an RF signal is transmitted through a transmission line to the cavity. The impedance mismatch between the transmission line and the cavity results in a reflection of part of the signal. The reflection coefficient is then measured across a frequency range using a vector network analyzer. In this study, the Kajfez’ algorithm is developed in Python to extract the Q-factor of the cavity and calculate the complex permittivity. The experimentally measured S ₁₁ is fitted using the Kajfez’ algorithm to determine the reflection coefficient of the cavity and extract the quality factor [Reference Kajfez6]. In this work, various granite rock samples are measured using a high Q-factor $\mathrm{TM}_{010}$ single-mode resonance cavity at 2.45 GHz to investigate their electromagnetic behavior. The permittivity of different granite rock samples are measured employing the reflection method, coupled with a specially developed Kajfez algorithm. The single-mode $\mathrm{TM}_{010}$ resonance cavity operating at 2.45 GHz, which is used to accurately measure the complex permittivity of the granite rock is illustrated in Fig. 1. Additionally, an Agilent network analyzer is utilized to measure the s-parameters, and a PC is used to extract the exact values through the developed algorithm.

Figure 1. $\mathrm{TM}_{010}$ single mode cavity for granite rock’s complex permittivity measurement.

Resonant cavities are microwave devices that resonate at a desired frequency with a high Q-factor, and they are utilized to measure the exact value of the complex permittivity ($\varepsilon = \varepsilon{'} - j\varepsilon{''}$) of materials. The single-mode resonance cavity serves this purpose in the dominant resonance mode [Reference Pozar7]. The algorithm developed by Kajfez is designed to estimate the complex permittivity of a sample using a resonance cavity and the reflection coefficient (S ₁₁) measurement method [Reference Kajfez6]. In this approach, the resonance frequency (f_l) and Q-factor (Q ₀) of the cavity are measured both with and without the sample. The dielectric constant ($\varepsilon{'}$) and dielectric loss ($\varepsilon{''}$) are calculated using equations (1) and (2) [Reference McNeal, Jang and Newnham8, Reference Venkatesh9], where V_c and V_s are the volume of the cavity and sample, f ₀ and f_s are the resonance frequency of the cavity with and without sample, and Q_Ls, and $Q_{L0}$ represent the Q-factor of the empty and loaded cavity, calculated using Kajfez’s algorithm. The constant values are determined through the perturbation technique, as detailed in [Reference McNeal, Jang and Newnham8, Reference Venkatesh9]. So, for cylindrical cavities and samples, the volume can be replace with $\pi r^2$ [Reference Kanpan, Khansalee, Puangngernmak and Chalermwisutkul10].

(1)\begin{equation} \varepsilon{'} = 1+0.539\frac{V_{c}\left(f_{0}-f_{s}\right)}{V_{s}f_{0}}, \end{equation}

(2)\begin{equation} \varepsilon{''} = 0.269\times\frac{V_{c}}{V_{s}}\times\left({\frac{1}{Q_{LS}}-\frac{1}{Q_{L}}}\right). \end{equation}

So,

(3)\begin{equation} tan\,\delta =\frac{\varepsilon{''}}{\varepsilon{'}}. \end{equation}

Using above literature, to improve accuracy of complex permittivity measurement, the Kajfez’s algorithm developed in Python is used in this work. The developed algorithm could be used for calculating Q-factor using lower points and narrower resonance band [Reference Alekajbaf, Coman, Szaniawski and Dancila12].

Permittivity measurement results

In our designs, an average value for granite permittivity is considered that calculated using measurements from three kinds of available granite rock samples, as shown in Fig. 2. For the initial step of measuring the resonance frequency and Q-factor of the samples, the provided granite samples were placed in the middle of the cavity (as illustrated in Fig. 1). Additionally, Fig. 2 illustrates the measured reflection coefficients (S ₁₁) for both the empty cavity and the cavity loaded with samples. These measurements are conducted using an Agilent network analyzer N5221A.

Figure 2. Granite rock samples with different mixture of minerals and measured S ₁₁ and resonance frequencies for air and granite rock samples.

The fitted graphs by the developed algorithm for the reflection coefficient of empty cavity and loaded by rock samples are shown in Fig. 3. The extracted values of resonance frequency and quality factor for each samples are presented in Table 1. In addition, the complex permittivity permeability are calculated using (1)–(3), these values are given in the table. According to the measured values, an average value can be used to simulate and analyze the electromagnetic behavior of granite rock that is equal to 4−j0.52.

Figure 3. Fitted the reflection coefficient graphs using the developed algorithm for calculating Q-factor of empty and loaded cavity.

Table 1. Extracted and calculated values for Q-factor ($Q_{\textit{0}}$), resonance frequency ($f_{\textit{res}}$), and complex permittivity

Applicator design

The applicators play a key role in microwave heating systems. They involve two different types of applicators or cavities: single-mode and multi-mode, each with different heating mechanisms. Single-mode microwave irradiation, known for its ability to effectively focus microwaves and induce rapid heating, is typically employed for localized effects such as heating and cracking on material surfaces. This makes it particularly suitable when coupled with rock cutting tools like drills and boreholes or when rock fragmentations are needed for downstream processes. Multi-mode microwave irradiation is employed for volumetric heating of rocks, serving a more generalized purpose, especially in the mineral processing industry. The distinction between single-mode and multi-mode cavities reflects the varied applications and mechanisms that microwaves offer, from precise localized treatments to more extensive industrial processes [Reference Teimoori and Hassani3, Reference Feng, Gaoming, Li, Zhang, Wan, Tianyang and Yanhua11, Reference Kingman, Jackson, Cumbane, Bradshaw, Rowson and Greenwood13, Reference Kingman, Jackson, Cumbane, Bradshaw, Rowson and Greenwood14]. The single-mode microwave cavity consists of a metallic enclosure and a waveguide as a coupling port. These metallic parts are designed in such a way that the polarization of the electromagnetic field from the microwave signal creates a well-defined standing wave pattern in the cavity space. This specific pattern, characterized by single-mode cavities, allows focusing microwaves in a small volume, and creating a high electric field. Since the electric field and power density are directly proportional, single-mode cavities enable rapid heating, allowing the dielectric material (such as rock) to be placed in positions where maximum heating rates and subsequent maximum mechanical stresses can be achieved [Reference Kingman, Jackson, Cumbane, Bradshaw, Rowson and Greenwood14]. Therefore, designing a single-mode applicator and concentrating the maximum electric field in the center of the granite sample will be the best choice for designing an optimal rock comminution system. In this research, a $\mathrm{TM}_{010}$ single mode cavity at 3 GHz is designed as an efficient microwave applicator. The designed applicator is shown in Fig. 4. It can be seen, the designed applicator consists of a $\mathrm{TM}_{010}$ cylindrical cavity, a WR340 waveguide coupling port, a granite rock sample, fixing pieces, and a sample holder. Also, the resonance frequency of a $TM_{01l}$ single-mode cylindrical cavity are calculated using [Reference Pozar7]:

Figure 4. (a) Designed single-mode $\mathrm{TM}_{010}$ cavity at 3 GHz. (b) Cross section of designed cavity.

(4)\begin{equation} f_{nml} =\frac{c}{2\pi\sqrt{\epsilon{'}\mu{'}}}\sqrt{\left(\frac{P_{nm}}{a}\right)^{2}+\left(\frac{\textit{l}\pi }{d}\right)^{2}}, \end{equation}

where a and d are radius and height of cavity which filled by dielectric material with $\varepsilon{'}$ and $\mu{'}$ characteristics. Also, n, m, and l represent the dominant mode of cavity and P_nm is a constant value which is 2.405 for $TM_{01l}$ [Reference Pozar7].

As shown in Fig. 4, the granite rock sample is placed in the middle of the cavity using a dielectric holder. This material is chosen based on the very high electric field density inside the single-mode cavities. To use the cavity for studying rock comminution, paying attention to the breakdown voltage of the material inside the cavity is important for this process. Therefore, PEEK material with higher breakdown voltage than air and rock sample is a good choice to fill the space inside the cavity and keep the rock sample in the center of the cavity. In addition, to compensate the dimensions of the samples and adjust the resonance frequency, small pieces of PTFE have been used inside the sample place. The breakdown voltage of the materials used in the cavity is shown in Table 2.

Table 2. Breakdown voltage of used materials in the designed cavity [Reference Haynes15]

The designed cavity is simulated using HFSS software and its E-field and frequency response ($S_{11}=-22$ dB) are illustrated in Fig. 5.

Figure 5. Frequency response (S ₁₁) of the designed cavity.

Simulation results

The granite rock sample has been fixed in the center of the designed cavity using the PEEK holder. The distribution of the electric field inside the granite rock sample for different microwave powers radiated at a frequency of 3 GHz is shown in Fig. 6. As can be seen, the maximum of the electric field is concentrated in the center of the granite rock, which will cause it to be crushed if it reaches the breakdown voltage level. The maximum electric field in the center of the granite sample is given in Fig. 6.

Figure 6. E-field distribution inside the granite rock sample for different microwave powers irradiated at 3 GHz.

The maximum electric field in the center of the granite sample, in terms of the amount of radiated power inside the cavity at a frequency of 3 GHz, is shown in Fig. 7. If the breakdown voltage of granite rock considered as the electric field required to crush the rock [Reference Li, Duan, Tan, Chikhotkin and Wang16], it can be seen that by radiating approximately 4.5 mW of microwave power inside the cavity, this level of electric field will be generated within the rock. Before reaching this electric field threshold, the temperature difference created in various compositions of the granite stone will increase the mechanical stress, initiating the crushing process.

Figure 7. Maximum E-field (V/m) inside the granite vs. exposed microwave power inside the $\mathrm{TM}_{010}$ cavity.

Experimental results

The fabricated cavity is illustrated in Fig. 8(a), and its frequency response (S ₁₁) is measured using a network analyzer. Considering mechanical fabrication tolerances, an IRIS is employed to optimize the frequency response. The experimental results are presented in Fig. 8(b). The frequency response (S ₁₁) of the optimized fabricated cavity at 3 GHz is approximately −17 dB, as shown in Fig. 8(b).

Figure 8. (a) Fabricated $\mathrm{TM}_{010}$ cavity. (b) Measured frequency response (S ₁₁).